Polynomial Operations and Factoring Polynomials Notes Bundle Algebra 2
STEM Nerdd
134 Followers
Resource Type
Standards
CCSSHSA-APR.A.1
CCSSHSA-APR.B.2
CCSSHSA-APR.D.6
Formats Included
- Google Slidesβ’
Pages
40+
STEM Nerdd
134 Followers
Includes Google Appsβ’
This bundle contains one or more resources with Google apps (e.g. docs, slides, etc.).
Products in this Bundle (5)
Also included in
- I used these digital resources for both in person and virtual students in my Algebra 2 class. Unit 4 took me about 2 weeks with my kids! This is a growing bundle containing guided notes, activities, games, and test. Most everything in Google Slides so ready to be assigned in Google Classroom and othPrice $13.00Original Price $18.00Save $5.00
Description
Need a NO PREP week's worth of notes where students learn how to add, subtract, multiply, divide, AND factor polynomials? These interactive Google Slides have scaffolded notes and drag and drop matching activities for each mini lesson! A graphic organizer is also included for factoring! These are also a part of my growing Unit 4 bundle! These are all aligned to the standards..
CCSS.HSA-APR.A.1
CCSS.HSA-APR.B.2
CCSS.HSA-APR.D.6
TEKS.MA.9-12.A2.7.B
TEKS.MA.9-12.A2.7.C
TEKS.MA.9-12.A2.7.D
TEKS.MA.9-12.A2.7.E
Disclaimer: It took me a week in my class. May be longer or shorter for you?
Please feel free to go check out my other STEM activities and fun games I have in my store!
Total Pages
40+
Answer Key
N/A
Teaching Duration
1 Week
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Standards
to see state-specific standards (only available in the US).
CCSSHSA-APR.A.1
Understand that polynomials form a system analogous to the integers, namely, they are closed under the operations of addition, subtraction, and multiplication; add, subtract, and multiply polynomials.
CCSSHSA-APR.B.2
Know and apply the Remainder Theorem: For a polynomial π±(πΉ) and a number π’, the remainder on division by πΉ β π’ is π±(π’), so π±(π’) = 0 if and only if (πΉ β π’) is a factor of π±(πΉ).
CCSSHSA-APR.D.6
Rewrite simple rational expressions in different forms; write π’(πΉ)/π£(πΉ) in the form π²(πΉ) + π³(πΉ)/π£(πΉ), where π’(πΉ), π£(πΉ), π²(πΉ), and π³(πΉ) are polynomials with the degree of π³(πΉ) less than the degree of π£(πΉ), using inspection, long division, or, for the more complicated examples, a computer algebra system.